Small Mersenne Prime Factors (page 5566/5745)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Dig.	Year
164022211271	328044422543	12	~2019
164029283063	328058566127	12	~2019
164045731823	328091463647	12	~2019
164060538731	328121077463	12	~2019
164088313379	328176626759	12	~2019
164094057151	1457...750089	15	2025
164102485331	328204970663	12	~2019
164123043659	328246087319	12	~2019
164135220731	328270441463	12	~2019
164138321591	328276643183	12	~2019
164139222491	328278444983	12	~2019
164146043543	328292087087	12	~2019
164155944739	2656...587703	15	2025
164193278999	328386557999	12	~2019
164199964979	328399929959	12	~2019
164202901979	328405803959	12	~2019
164208681443	328417362887	12	~2019
164210419643	328420839287	12	~2019
164213641103	328427282207	12	~2019
164226487559	328452975119	12	~2019
164231394059	328462788119	12	~2019
164257544723	328515089447	12	~2019
164257750703	328515501407	12	~2019
164263247363	328526494727	12	~2019
164275718591	328551437183	12	~2019

Exponent	Prime Factor	Dig.	Year
164284096439	328568192879	12	~2019
164292916643	328585833287	12	~2019
164299066523	328598133047	12	~2019
164313097199	328626194399	12	~2019
164318700251	328637400503	12	~2019
164319433309	3864...142769	15	2026
164327593511	328655187023	12	~2019
164328716243	328657432487	12	~2019
164353822403	328707644807	12	~2019
164359577953	2859...563823	14	2024
164396074079	328792148159	12	~2019
164404469459	328808938919	12	~2019
164407173743	328814347487	12	~2019
164431577939	328863155879	12	~2019
164433219383	328866438767	12	~2019
164447661731	6216...134319	14	2023
164457497783	328914995567	12	~2019
164460387023	328920774047	12	~2019
164467844771	328935689543	12	~2019
164485923971	328971847943	12	~2019
164498449763	328996899527	12	~2019
164502373991	329004747983	12	~2019
164507426663	329014853327	12	~2019
164512161251	329024322503	12	~2019
164521132343	329042264687	12	~2019

Exponent	Prime Factor	Dig.	Year
164524020491	329048040983	12	~2019
164524337059	1329...343673	15	2026
164532876251	329065752503	12	~2019
164533565159	329067130319	12	~2019
164537786999	329075573999	12	~2019
164543606341	1510...621039	15	2025
164545193591	329090387183	12	~2019
164554458011	329108916023	12	~2019
164561153831	329122307663	12	~2019
164573556239	329147112479	12	~2019
164581458803	329162917607	12	~2019
164591036591	329182073183	12	~2019
164598368003	329196736007	12	~2019
164614106831	329228213663	12	~2019
164617595063	329235190127	12	~2019
164621099567	1886...103783	15	2025
164625337319	329250674639	12	~2019
164636987051	329273974103	12	~2019
164637168623	329274337247	12	~2019
164637216671	329274433343	12	~2019
164647553783	329295107567	12	~2019
164655704639	329311409279	12	~2019
164661120251	329322240503	12	~2019
164680425023	329360850047	12	~2019
164680733771	329361467543	12	~2019

Exponent	Prime Factor	Dig.	Year
164684052563	329368105127	12	~2019
164685269579	329370539159	12	~2019
164686825931	329373651863	12	~2019
164689831451	329379662903	12	~2019
164690539397	2750...792991	15	2026
164695310159	329390620319	12	~2019
164711804639	329423609279	12	~2019
164727269939	329454539879	12	~2019
164727762779	329455525559	12	~2019
164731967483	329463934967	12	~2019
164733802483	2625...157903	15	2025
164744137619	329488275239	12	~2019
164745627719	329491255439	12	~2019
164750549819	329501099639	12	~2019
164754569051	329509138103	12	~2019
164755541789	3295...357801	14	2024
164758171769	3690...476257	14	2023
164759561399	329519122799	12	~2019
164762081111	329524162223	12	~2019
164775089579	329550179159	12	~2019
164807708183	329615416367	12	~2019
164809493423	329618986847	12	~2019
164825485439	329650970879	12	~2019
164845503761	4978...135823	14	2024
164854734959	329709469919	12	~2019

5.441.361 digits

26-03-15